q(sl(n))-invariant quantization of symmetric coadjoint orbits via reflection equation algebra

Abstract

We study relations between the two-parameter q(sl(n))-invariant deformation quantization on sl*(n) and the reflection equation algebra. The latter is described by a quantum permutation on (n) given explicitly. The reflection equation algebra is used for constructing the one-parameter quantization on coadjoint orbits, including symmetric and certain bisymmetric and nilpotent ones. Our approach is based on embedding the quantized function algebras on the orbits into the algebra of functions on the quantum group SLq(n) via reflection equation algebra characters.

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